How do I correlate the dimensional equatorial vertices of a dodecahydrophoric cubeangle?

i dunno why but this actually made me laugh pretty hard.
my old geometry teacher had a chart with a bunch of the polyhedrons and we would just ask her questions about them instead of whatever the actual geometry was.

How do I correlate the dimensional equatorial vertices of a dodecahydrophoric cubeangle?

i dunno why but this actually made me laugh pretty hard.
my old geometry teacher had a chart with a bunch of the polyhedrons and we would just ask her questions about them instead of whatever the actual geometry was.

What the heck?

"Life is not about waiting for the storm to pass. It's learning how to dance in the rain."

How do I correlate the dimensional equatorial vertices of a dodecahydrophoric cubeangle?

i dunno why but this actually made me laugh pretty hard.
my old geometry teacher had a chart with a bunch of the polyhedrons and we would just ask her questions about them instead of whatever the actual geometry was.

What the heck?

fine,
if Given f(x) = e(^x2 - x) find the the intervals of increase and decrease of f, the values of x for which f has a local extremum, and the intervals of concavity and inflection points.
thanks

How do I correlate the dimensional equatorial vertices of a dodecahydrophoric cubeangle?

i dunno why but this actually made me laugh pretty hard.
my old geometry teacher had a chart with a bunch of the polyhedrons and we would just ask her questions about them instead of whatever the actual geometry was.

What the heck?

fine,
if Given f(x) = e(^x2 - x) find the the intervals of increase and decrease of f, the values of x for which f has a local extremum, and the intervals of concavity and inflection points.
thanks

*clap* Bravo, bravo! Nice job done!

"Life is not about waiting for the storm to pass. It's learning how to dance in the rain."